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Directory:Jon Awbrey/Papers/Inquiry Driven Systems : Part 6 (view source)

Revision as of 03:20, 27 September 2012

2,100 bytes added ,  03:20, 27 September 2012
→‎6.24. Literal Intensional Representations: format table
Line 4,676: Line 4,676:  
<br>
 
<br>
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<pre>
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{| align="center" border="1" cellpadding="8" cellspacing="0" style="text-align:center; width:75%"
Table 54.2 Pragmatic Literal Codes for Interpreters A & B
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|+ style="height:30px" |
Element Vector Conjunct Term Code
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<math>\text{Table 54.2} ~~ \text{Pragmatic Literal Codes for Interpreters A and B}\!</math>
A 100000 o1 (o2)(s1)(s2)(s3)(s4) <o1>W
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|- style="background:#f0f0ff"
B 010000 (o1) o2 (s1)(s2)(s3)(s4) <o2>W
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| <math>\text{Element}\!</math>
"A" 001000 (o1)(o2) s1 (s2)(s3)(s4) <s1>W
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| <math>\text{Vector}\!</math>
"B" 000100 (o1)(o2)(s1) s2 (s3)(s4) <s2>W
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| <math>\text{Conjunct Term}\!</math>
"i" 000010 (o1)(o2)(s1)(s2) s3 (s4) <s3>W
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| <math>\text{Code}\!</math>
"u" 000001 (o1)(o2)(s1)(s2)(s3) s4 <s4>W
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|-
</pre>
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| valign="bottom" width="20%" |
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<math>\begin{matrix}
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\text{A}
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\\[4pt]
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\text{B}
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\\[4pt]
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{}^{\backprime\backprime} \text{A} {}^{\prime\prime}
 +
\\[4pt]
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{}^{\backprime\backprime} \text{B} {}^{\prime\prime}
 +
\\[4pt]
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{}^{\backprime\backprime} \text{i} {}^{\prime\prime}
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\\[4pt]
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{}^{\backprime\backprime} \text{u} {}^{\prime\prime}
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\end{matrix}</math>
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| valign="bottom" width="20%" |
 +
<math>\begin{matrix}
 +
100000
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\\[4pt]
 +
010000
 +
\\[4pt]
 +
001000
 +
\\[4pt]
 +
000100
 +
\\[4pt]
 +
000010
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\\[4pt]
 +
000001
 +
\end{matrix}</math>
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| valign="bottom" width="40%" |
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<math>\begin{matrix}
 +
~\underline{\underline{o_1}}~
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(\underline{\underline{o_2}})
 +
(\underline{\underline{s_1}})
 +
(\underline{\underline{s_2}})
 +
(\underline{\underline{s_3}})
 +
(\underline{\underline{s_4}})
 +
\\[4pt]
 +
(\underline{\underline{o_1}})
 +
~\underline{\underline{o_2}}~
 +
(\underline{\underline{s_1}})
 +
(\underline{\underline{s_2}})
 +
(\underline{\underline{s_3}})
 +
(\underline{\underline{s_4}})
 +
\\[4pt]
 +
(\underline{\underline{o_1}})
 +
(\underline{\underline{o_2}})
 +
~\underline{\underline{s_1}}~
 +
(\underline{\underline{s_2}})
 +
(\underline{\underline{s_3}})
 +
(\underline{\underline{s_4}})
 +
\\[4pt]
 +
(\underline{\underline{o_1}})
 +
(\underline{\underline{o_2}})
 +
(\underline{\underline{s_1}})
 +
~\underline{\underline{s_2}}~
 +
(\underline{\underline{s_3}})
 +
(\underline{\underline{s_4}})
 +
\\[4pt]
 +
(\underline{\underline{o_1}})
 +
(\underline{\underline{o_2}})
 +
(\underline{\underline{s_1}})
 +
(\underline{\underline{s_2}})
 +
~\underline{\underline{s_3}}~
 +
(\underline{\underline{s_4}})
 +
\\[4pt]
 +
(\underline{\underline{o_1}})
 +
(\underline{\underline{o_2}})
 +
(\underline{\underline{s_1}})
 +
(\underline{\underline{s_2}})
 +
(\underline{\underline{s_3}})
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~\underline{\underline{s_4}}~
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\end{matrix}</math>
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| valign="bottom" width="20%" |
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<math>\begin{matrix}
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{\langle\underline{\underline{o_1}}\rangle}_W
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\\[4pt]
 +
{\langle\underline{\underline{o_2}}\rangle}_W
 +
\\[4pt]
 +
{\langle\underline{\underline{s_1}}\rangle}_W
 +
\\[4pt]
 +
{\langle\underline{\underline{s_2}}\rangle}_W
 +
\\[4pt]
 +
{\langle\underline{\underline{s_3}}\rangle}_W
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\\[4pt]
 +
{\langle\underline{\underline{s_4}}\rangle}_W
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\end{matrix}</math>
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|}
    
<br>
 
<br>
Jon Awbrey
12,089

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